Diagonal poset Ramsey numbers

Abstract

A poset (Q,Q) contains an induced copy of a poset (P,P) if there exists an injective mapping φ P Q such that for any two elements X,Y∈ P, XP Y if and only if φ(X)Q φ(Y). By Qn we denote the Boolean lattice (2[n],⊂eq). The poset Ramsey number R(P,Q) for posets P and Q is the least integer N for which any coloring of the elements of QN in blue and red contains either a blue induced copy of P or a red induced copy of Q. In this paper, we show that R(Qm,Qn) nm-(1-o(1))n m where n m and m is sufficiently large. This improves the best known upper bound on R(Qn,Qn) from n2-n+2 to n2-(1-o(1)) n n. Furthermore, we determine R(P,P) where P is an n-fork or n-diamond up to an additive constant of 2. A poset (Q,Q) contains a weak copy of (P,P) if there is an injection P Q such that (X)Q (Y) for any X,Y∈ P with XP Y. The weak poset Ramsey number Rw(P,Q) is the smallest N for which any blue/red-coloring of QN contains a blue weak copy of P or a red weak copy of Q. We show that Rw(Qn,Qn) 0.96n2.